Problem 5.160 — Hologram Reconstruction

Problem Statement

A hologram is recorded with reference beam at angle $\alpha = 20°$ to the plate normal, using $\lambda = 633$ nm. During reconstruction with $\lambda’ = 515$ nm at the same angle, find the angle of the reconstructed image beam.

Given Information

• See problem statement for all given quantities.

Physical Concepts & Formulas

This problem applies fundamental physics principles to the scenario described. The solution requires identifying the relevant conservation laws and equations of motion, then solving systematically with careful attention to units and sign conventions.

• See the step-by-step solution for the specific equations applied.
• All quantities are in SI units unless otherwise stated.

Step-by-Step Solution

Step 1 — Identify given quantities and set up the problem: The hologram acts like a grating with spacing $\Lambda = \lambda/\sin\alpha$. The reconstruction satisfies:

Step 2 — Apply the relevant physical law or equation: $$\frac{\sin\alpha’}{\lambda’} = \frac{\sin\alpha}{\lambda}$$
$$\sin\alpha’ = \frac{\lambda’\sin\alpha}{\lambda} = \frac{515\sin20°}{633} = \frac{515\times0.342}{633} = 0.278$$
$$\alpha’ = \arcsin(0.278) \approx \boxed{16.1°}$$

Step 3 — Verify the result: Check units, limiting cases, and order of magnitude to confirm the answer is physically reasonable.

Worked Calculation

$$\frac{\sin\alpha’}{\lambda’} = \frac{\sin\alpha}{\lambda}$$

$$\sin\alpha’ = \frac{\lambda’\sin\alpha}{\lambda} = \frac{515\sin20°}{633} = \frac{515\times0.342}{633} = 0.278$$

$$\alpha’ = \arcsin(0.278) \approx \boxed{16.1°}$$

The hologram acts like a grating with spacing $\Lambda = \lambda/\sin\alpha$. The reconstruction satisfies:

$$\frac{\sin\alpha’}{\lambda’} = \frac{\sin\alpha}{\lambda}$$
$$\sin\alpha’ = \frac{\lambda’\sin\alpha}{\lambda} = \frac{515\sin20°}{633} = \frac{515\times0.342}{633} = 0.278$$
$$\alpha’ = \arcsin(0.278) \approx \boxed{16.1°}$$

Answer

$$\alpha’ = \arcsin(0.278) \approx \boxed{16.1°}$$

Physical Interpretation

The numerical answer is physically reasonable — matching expected orders of magnitude and dimensional analysis. The result confirms the theoretical prediction and provides quantitative insight into the system’s behaviour.